2006
DOI: 10.1007/s00033-006-5099-2
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The self-similar solutions of the Tricomi-type equations

Abstract: This paper analyses the properties of the family of self-similar solutions of the generalized Tricomi equation utt − t 2k △ u = 0 (2k ∈ N) in the domain R 1+n + by considering initial conditions on the functions and their derivatives, posed as the Cauchy problem with homogeneous initial data. For specific values of the power k (= 1/2 or = 3/2) and n = 1 this problem has applications in the aerodynamics of airfoils operating in transonic flows of perfect or dense gases, respectively. An integral transformation … Show more

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Cited by 17 publications
(15 citation statements)
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“…[29].) Consider the Cauchy problem for the Tricomi-type equation (1.7), (2.1) with the homogeneous data…”
Section: Self-similar Solutions Of the Linear Tricomi-type Equation Inmentioning
confidence: 99%
See 2 more Smart Citations
“…[29].) Consider the Cauchy problem for the Tricomi-type equation (1.7), (2.1) with the homogeneous data…”
Section: Self-similar Solutions Of the Linear Tricomi-type Equation Inmentioning
confidence: 99%
“…The order of singularity on the light cone depends on a and b, and is given by the next theorem. [29].) Consider the Cauchy problem for the Tricomi-type equation (1.7), (2.1) with the homogeneous data ϕ 0 ∈ C ∞ (R n * ) and ϕ 1 ∈ C ∞ (R n * ) of order −a and −b, respectively.…”
Section: Self-similar Solutions Of the Linear Tricomi-type Equation Inmentioning
confidence: 99%
See 1 more Smart Citation
“…t u − t m ∆u = |u| p , (t, x) ∈ R 1+n + , u(0, x) = u 0 (x), ∂ t u(0, x) = u 1 (x), (1.3) where m ∈ N, p > 1, n ≥ 2. For the local existence and regularity of solution u to (1.3) under weak regularity assumptions on (u 0 , u 1 ), the reader may consult [24,25,26,34,35]. If u i ∈ C ∞ 0 (R n ) (i = 0, 1) Yagdjian in [34] proved the blowup and global existence of u when p belongs to different intervals.…”
Section: Daoyin He Ingo Witt and Huicheng Yinmentioning
confidence: 99%
“…There are extensive results for both linear and semilinear Tricomi equations in n space dimensions (n ∈ N). For instances, the authors of [1,32,35] have computed the forward fundamental solution of the linear Tricomi equation ∂ 2 t u − t∆u = 0 explicitly. The authors of [11,19,20,21,22] have obtained a series of interesting results on the existence and uniqueness of solutions u to the semilinear Tricomi equation ∂ 2 t u − t∆u = f (t, x, u) in bounded domains, under certain restrictions on the nonlinearity f (t, x, u).…”
Section: The Linear Equation ∂mentioning
confidence: 99%